Anomalous singularity of the solution of the vector Dyson equation in the critical case

Abstract

We consider the solution of the vector Dyson equation -1/m=z+Sm in the case when S has a block staircase structure with (n-1) different critical zero blocks below the strictly positive anti-diagonal and all elements right above the anti-diagonal are strictly positive. We prove that the components of m behave as fractional powers of z in the neighbourhood of zero and show that the self-consistent density of states (E) behaves as E-n-1n+1 as E tends to zero, where n2 is a number of blocks. Both constant block and non-constant block cases are considered. In the non-constant case uniform estimates for the components of m are obtained.